Representations of Group Algebras in Spaces of Completely Bounded Maps

Abstract

Let G be a locally compact group, M(G) denote its measure algebra and L1(G) denote its group algebra. Also, let pi:G->U(H) be a strongly continuous unitary representation, and let CBsigma(B(H)) be the space of normal completely bounded maps on B(H). We study the range of the map Gammapi:M(G)->CBsigma(B(H)), Gammapi(mu)= intG pi(s) pi(s)*dmu(s) where we identify CBsigma(B(H)) with the extended Haagerup tensor product B(H)ehB(H)$. We use the fact that the C*-algebra generated by integrating pi to L1(G) is unital exactly when pi is norm continuous to show that Gammapi(L1(G))⊂ B(H)ehB(H) exactly when pi is norm continuous. For the case that G is abelian, we study Gammapi(M(G)) as a subset of the Varopoulos algebra. We also characterise positive definite elements of the Varopoulos algebra in terms of completely positive operators.

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